Twelve-tone Technique
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The twelve-tone technique—also known as dodecaphony, twelve-tone serialism, and (in British usage) twelve-note composition—is a method of
musical composition Musical composition can refer to an original piece or work of music, either vocal or instrumental, the structure of a musical piece or to the process of creating or writing a new piece of music. People who create new compositions are called ...
. The technique is a means of ensuring that all 12 notes of the chromatic scale are sounded as often as one another in a piece of music while preventing the emphasis of any one notePerle 1977, 2. through the use of tone rows, orderings of the 12 pitch classes. All 12 notes are thus given more or less equal importance, and the music avoids being in a key. The technique was first devised by Austrian composer Josef Matthias Hauer, who published his "law of the twelve tones" in 1919. In 1923,
Arnold Schoenberg Arnold Schoenberg or Schönberg (, ; ; 13 September 187413 July 1951) was an Austrian-American composer, music theorist, teacher, writer, and painter. He is widely considered one of the most influential composers of the 20th century. He was as ...
(1874–1951) developed his own, better-known version of 12-tone technique, which became associated with the "
Second Viennese School The Second Viennese School (german: Zweite Wiener Schule, Neue Wiener Schule) was the group of composers that comprised Arnold Schoenberg and his pupils, particularly Alban Berg and Anton Webern, and close associates in early 20th-century Vienna. ...
" composers, who were the primary users of the technique in the first decades of its existence. Over time, the technique increased greatly in popularity and eventually became widely influential on 20th-century composers. Many important composers who had originally not subscribed to or actively opposed the technique, such as Aaron Copland and
Igor Stravinsky Igor Fyodorovich Stravinsky (6 April 1971) was a Russian composer, pianist and conductor, later of French (from 1934) and American (from 1945) citizenship. He is widely considered one of the most important and influential composers of the ...
, eventually adopted it in their music. Schoenberg himself described the system as a "Method of composing with twelve tones which are related only with one another".Schoenberg 1975, 218. It is commonly considered a form of
serialism In music, serialism is a method of Musical composition, composition using series of pitches, rhythms, dynamics, timbres or other elements of music, musical elements. Serialism began primarily with Arnold Schoenberg's twelve-tone technique, thou ...
. Schoenberg's fellow countryman and contemporary Hauer also developed a similar system using unordered
hexachord In music, a hexachord (also hexachordon) is a six-note series, as exhibited in a scale (hexatonic or hexad) or tone row. The term was adopted in this sense during the Middle Ages and adapted in the 20th century in Milton Babbitt's serial theor ...
s or ''
tropes Trope or tropes may refer to: Arts, entertainment, and media * Trope (cinema), a cinematic convention for conveying a concept * Trope (literature), a figure of speech or common literary device * Trope (music), any of a variety of different things ...
''—independent of Schoenberg's development of the twelve-tone technique. Other composers have created systematic use of the chromatic scale, but Schoenberg's method is considered to be most historically and aesthetically significant.


History of use

Though most sources will say it was invented by Austrian composer
Arnold Schoenberg Arnold Schoenberg or Schönberg (, ; ; 13 September 187413 July 1951) was an Austrian-American composer, music theorist, teacher, writer, and painter. He is widely considered one of the most influential composers of the 20th century. He was as ...
in 1921 and first described privately to his associates in 1923, in fact Josef Matthias Hauer published his "law of the twelve tones" in 1919, requiring that all twelve chromatic notes sound before any note is repeated. The method was used during the next twenty years almost exclusively by the composers of the
Second Viennese School The Second Viennese School (german: Zweite Wiener Schule, Neue Wiener Schule) was the group of composers that comprised Arnold Schoenberg and his pupils, particularly Alban Berg and Anton Webern, and close associates in early 20th-century Vienna. ...
Alban Berg Alban Maria Johannes Berg ( , ; 9 February 1885 – 24 December 1935) was an Austrian composer of the Second Viennese School. His compositional style combined Romantic lyricism with the twelve-tone technique. Although he left a relatively sma ...
, Anton Webern, and Schoenberg himself. Although, another important composer in this period was Elisabeth Lutyens who wrote more than 50 pieces using the serial method. The twelve tone technique was preceded by "freely" atonal pieces of 1908–1923 which, though "free", often have as an "integrative element ... a minute intervallic cell" which in addition to expansion may be transformed as with a tone row, and in which individual notes may "function as pivotal elements, to permit overlapping statements of a basic cell or the linking of two or more basic cells". The twelve-tone technique was also preceded by "nondodecaphonic serial composition" used independently in the works of
Alexander Scriabin Alexander Nikolayevich Scriabin (; russian: Александр Николаевич Скрябин ; – ) was a Russian composer and virtuoso pianist. Before 1903, Scriabin was greatly influenced by the music of Frédéric Chopin and composed ...
,
Igor Stravinsky Igor Fyodorovich Stravinsky (6 April 1971) was a Russian composer, pianist and conductor, later of French (from 1934) and American (from 1945) citizenship. He is widely considered one of the most important and influential composers of the ...
,
Béla Bartók Béla Viktor János Bartók (; ; 25 March 1881 – 26 September 1945) was a Hungarian composer, pianist, and ethnomusicologist. He is considered one of the most important composers of the 20th century; he and Franz Liszt are regarded as H ...
,
Carl Ruggles Carl Ruggles (born Charles Sprague Ruggles; March 11, 1876 – October 24, 1971) was an American composer, painter and teacher. His pieces employed " dissonant counterpoint", a term coined by fellow composer and musicologist Charles Seeger to ...
, and others.Perle 1977, 37. Oliver Neighbour argues that Bartók was "the first composer to use a group of twelve notes consciously for a structural purpose", in 1908 with the third of his fourteen bagatelles. "Essentially, Schoenberg and Hauer systematized and defined for their own dodecaphonic purposes a pervasive technical feature of 'modern' musical practice, the
ostinato In music, an ostinato (; derived from Italian word for ''stubborn'', compare English ''obstinate'') is a motif or phrase that persistently repeats in the same musical voice, frequently in the same pitch. Well-known ostinato-based pieces include ...
". Additionally, John Covach argues that the strict distinction between the two, emphasized by authors including Perle, is overemphasized:
The distinction often made between Hauer and the Schoenberg school—that the former's music is based on unordered hexachords while the latter's is based on an ordered series—is false: while he did write pieces that could be thought of as "trope pieces", much of Hauer's twelve-tone music employs an ordered series.
The "strict ordering" of the Second Viennese school, on the other hand, "was inevitably tempered by practical considerations: they worked on the basis of an interaction between ordered and unordered pitch collections."Whittall 2008, 24. Rudolph Reti, an early proponent, says: "To replace one structural force (tonality) by another (increased thematic oneness) is indeed the fundamental idea behind the twelve-tone technique", arguing it arose out of Schoenberg's frustrations with free atonality,Reti 1958 providing a "positive premise" for atonality. In Hauer's breakthrough piece ''Nomos'', Op. 19 (1919) he used twelve-tone sections to mark out large formal divisions, such as with the opening five statements of the same twelve-tone series, stated in groups of five notes making twelve five-note phrases. Felix Khuner contrasted Hauer's more mathematical concept with Schoenberg's more musical approach. Schoenberg's idea in developing the technique was for it to "replace those structural differentiations provided formerly by tonal harmonies". As such, twelve-tone music is usually atonal, and treats each of the 12 semitones of the chromatic scale with equal importance, as opposed to earlier classical music which had treated some notes as more important than others (particularly the tonic and the
dominant note In music, the dominant is the fifth scale degree () of the diatonic scale. It is called the ''dominant'' because it is second in importance to the first scale degree, the tonic. In the movable do solfège system, the dominant note is sung as "S ...
). The technique became widely used by the fifties, taken up by composers such as
Milton Babbitt Milton Byron Babbitt (May 10, 1916 – January 29, 2011) was an American composer, music theorist, mathematician, and teacher. He is particularly noted for his Serialism, serial and electronic music. Biography Babbitt was born in Philadelphia t ...
, Luciano Berio,
Pierre Boulez Pierre Louis Joseph Boulez (; 26 March 1925 – 5 January 2016) was a French composer, conductor and writer, and the founder of several musical institutions. He was one of the dominant figures of post-war Western classical music. Born in Mont ...
, Luigi Dallapiccola, Ernst Krenek, Riccardo Malipiero, and, after Schoenberg's death,
Igor Stravinsky Igor Fyodorovich Stravinsky (6 April 1971) was a Russian composer, pianist and conductor, later of French (from 1934) and American (from 1945) citizenship. He is widely considered one of the most important and influential composers of the ...
. Some of these composers extended the technique to control aspects other than the pitches of notes (such as duration, method of attack and so on), thus producing serial music. Some even subjected all elements of music to the serial process.
Charles Wuorinen Charles Peter Wuorinen (; June 9, 1938 – March 11, 2020) was an American composer of contemporary classical music based in New York City. He performed his works and other 20th-century music as pianist and conductor. He composed more than ...
said in a 1962 interview that while "most of the Europeans say that they have 'gone beyond' and 'exhausted' the twelve-tone system", in America, "the twelve-tone system has been carefully studied and generalized into an edifice more impressive than any hitherto known." American composer
Scott Bradley Scott Bradley may refer to: * Scott Bradley (composer) (1891–1977), American composer, pianist, and conductor * Scott Bradley (baseball) (born 1960), American baseball catcher * Scott Bradley (politician) (born 1952), American politician and u ...
, best known for his musical scores for works like '' Tom & Jerry'' and '' Droopy Dog'', utilized the 12-tone technique in his work. Bradley described his use thus: An example of Bradley's use of the technique to convey building tension occurs in the ''Tom & Jerry'' short "
Puttin' on the Dog This is a complete list of the 164 shorts in the ''Tom and Jerry'' series produced and released between 1940 and 2014. Of these, 162 are theatrical shorts, one is a made-for-TV short, and one is a 2-minute sketch shown as part of a telethon. ...
", from 1944. In a scene where the mouse, wearing a dog mask, runs across a yard of dogs "in disguise", a chromatic scale represents both the mouse's movements, and the approach of a suspicious dog, mirrored octaves lower. Apart from his work in cartoon scores, Bradley also composed tone poems that were performed in concert in California. Rock guitarist Ron Jarzombek used a twelve-tone system for composing
Blotted Science Blotted Science is an instrumental progressive metal supergroup headed by Ron Jarzombek (Watchtower, Spastic Ink), bassist Alex Webster (Cannibal Corpse) and drummer Hannes Grossmann (ex- Obscura, ex-Necrophagist). They formed under the name Machin ...
's extended play '' The Animation of Entomology''. He put the notes into a clock and rearranged them to be used that are side by side or consecutive He called his method "Twelve-Tone in Fragmented Rows."


Tone row

The basis of the twelve-tone technique is the '' tone row'', an ordered arrangement of the twelve notes of the chromatic scale (the twelve
equal tempered An equal temperament is a musical temperament or tuning system, which approximates just intervals by dividing an octave (or other interval) into equal steps. This means the ratio of the frequencies of any adjacent pair of notes is the same, w ...
pitch classes). There are four postulates or preconditions to the technique which apply to the row (also called a ''set'' or ''series''), on which a work or section is based: # The row is a specific ordering of all twelve notes of the chromatic scale (without regard to
octave In music, an octave ( la, octavus: eighth) or perfect octave (sometimes called the diapason) is the interval between one musical pitch and another with double its frequency. The octave relationship is a natural phenomenon that has been refer ...
placement). # No note is repeated within the row. # The row may be subjected to interval-preserving transformations—that is, it may appear in ''
inversion Inversion or inversions may refer to: Arts * , a French gay magazine (1924/1925) * ''Inversion'' (artwork), a 2005 temporary sculpture in Houston, Texas * Inversion (music), a term with various meanings in music theory and musical set theory * ...
'' (denoted I), '' retrograde'' (R), or '' retrograde-inversion'' (RI), in addition to its "original" or ''prime'' form (P). # The row in any of its four transformations may begin on any degree of the chromatic scale; in other words it may be freely transposed. (Transposition being an interval-preserving transformation, this is technically covered already by 3.) Transpositions are indicated by an integer between 0 and 11 denoting the number of semitones: thus, if the original form of the row is denoted P0, then P1 denotes its transposition upward by one semitone (similarly I1 is an upward transposition of the inverted form, R1 of the retrograde form, and RI1 of the retrograde-inverted form). (In Hauer's system postulate 3 does not apply.) A particular transformation (prime, inversion, retrograde, retrograde-inversion) together with a choice of transpositional level is referred to as a ''set form'' or ''row form''. Every row thus has up to 48 different row forms. (Some rows have fewer due to
symmetry Symmetry (from grc, συμμετρία "agreement in dimensions, due proportion, arrangement") in everyday language refers to a sense of harmonious and beautiful proportion and balance. In mathematics, "symmetry" has a more precise definit ...
; see the sections on ''derived rows'' and ''invariance'' below.)


Example

Suppose the prime form of the row is as follows: : Then the retrograde is the prime form in reverse order: : The inversion is the prime form with the intervals inverted (so that a rising minor third becomes a falling minor third, or equivalently, a rising major sixth): : And the retrograde inversion is the inverted row in retrograde: : P, R, I and RI can each be started on any of the twelve notes of the chromatic scale, meaning that 47 permutations of the initial tone row can be used, giving a maximum of 48 possible tone rows. However, not all prime series will yield so many variations because transposed transformations may be identical to each other. This is known as ''invariance''. A simple case is the ascending chromatic scale, the retrograde inversion of which is identical to the prime form, and the retrograde of which is identical to the inversion (thus, only 24 forms of this tone row are available). In the above example, as is typical, the retrograde inversion contains three points where the sequence of two pitches are identical to the prime row. Thus the generative power of even the most basic transformations is both unpredictable and inevitable. Motivic development can be driven by such internal consistency.


Application in composition

Note that rules 1–4 above apply to the construction of the row itself, and not to the interpretation of the row in the composition. (Thus, for example, postulate 2 does not mean, contrary to common belief, that no note in a twelve-tone work can be repeated until all twelve have been sounded.) While a row may be expressed literally on the surface as thematic material, it need not be, and may instead govern the pitch structure of the work in more abstract ways. Even when the technique is applied in the most literal manner, with a piece consisting of a sequence of statements of row forms, these statements may appear consecutively, simultaneously, or may overlap, giving rise to
harmony In music, harmony is the process by which individual sounds are joined together or composed into whole units or compositions. Often, the term harmony refers to simultaneously occurring frequencies, pitches ( tones, notes), or chords. However ...
. Durations, dynamics and other aspects of music other than the pitch can be freely chosen by the composer, and there are also no general rules about which tone rows should be used at which time (beyond their all being derived from the prime series, as already explained). However, individual composers have constructed more detailed systems in which matters such as these are also governed by systematic rules (see
serialism In music, serialism is a method of Musical composition, composition using series of pitches, rhythms, dynamics, timbres or other elements of music, musical elements. Serialism began primarily with Arnold Schoenberg's twelve-tone technique, thou ...
).


Topography

Analyst Kathryn Bailey has used the term 'topography' to describe the particular way in which the notes of a row are disposed in her work on the dodecaphonic music of Webern. She identifies two types of topography in Webern's music: block topography and linear topography. The former, which she views as the 'simplest', is defined as follows: 'rows are set one after the other, with all notes sounding in the order prescribed by this succession of rows, regardless of texture'. The latter is more complex: the musical texture 'is the product of several rows progressing simultaneously in as many voices' (note that these 'voices' are not necessarily restricted to individual instruments and therefore cut across the musical texture, operating as more of a background structure).


Elisions, Chains, and Cycles

Serial rows can be connected through elision, a term that describes 'the overlapping of two rows that occur in succession, so that one or more notes at the juncture are shared (are played only once to serve both rows)'. When this elision incorporates two or more notes it creates a row chain; when multiple rows are connected by the same elision (typically identified as the same in set-class terms) this creates a row chain cycle, which therefore provides a technique for organising groups of rows.


Properties of transformations

The tone row chosen as the basis of the piece is called the ''prime series'' (P). Untransposed, it is notated as P0. Given the twelve pitch classes of the chromatic scale, there are 12
factorial In mathematics, the factorial of a non-negative denoted is the product of all positive integers less than or equal The factorial also equals the product of n with the next smaller factorial: \begin n! &= n \times (n-1) \times (n-2) \t ...
(479,001,600) tone rows, although this is far higher than the number of ''unique'' tone rows (after taking transformations into account). There are 9,985,920 classes of twelve-tone rows up to equivalence (where two rows are equivalent if one is a transformation of the other). Appearances of P can be transformed from the original in three basic ways: * transposition up or down, giving Pχ. * reversing the order of the pitches, giving the '' retrograde'' (R) * turning each interval direction to its opposite, giving the ''
inversion Inversion or inversions may refer to: Arts * , a French gay magazine (1924/1925) * ''Inversion'' (artwork), a 2005 temporary sculpture in Houston, Texas * Inversion (music), a term with various meanings in music theory and musical set theory * ...
'' (I). The various transformations can be combined. These give rise to a set-complex of forty-eight forms of the set, 12 transpositions of the ''four'' basic forms: P, R, I, RI. The combination of the retrograde and inversion transformations is known as the '' retrograde inversion'' (''RI''). : thus, each cell in the following table lists the result of the transformations, a
four-group In mathematics, the Klein four-group is a group with four elements, in which each element is self-inverse (composing it with itself produces the identity) and in which composing any two of the three non-identity elements produces the third one ...
, in its row and column headers: : However, there are only a few numbers by which one may ''multiply'' a row and still end up with twelve tones. (Multiplication is in any case not interval-preserving.)


Derivation

''Derivation'' is transforming segments of the full chromatic, fewer than 12 pitch classes, to yield a complete set, most commonly using trichords, tetrachords, and hexachords. A derived set can be generated by choosing appropriate transformations of any trichord except 0,3,6, the diminished triad. A derived set can also be generated from any tetrachord that excludes the interval class 4, a major third, between any two elements. The opposite, ''partitioning'', uses methods to create segments from sets, most often through
registral difference A register is the "height" or range of a note, set of pitches or pitch classes, melody, part, instrument, or group of instruments. A higher register indicates higher pitch. *Example 1: Violins are in a higher register than cellos. In woodwind ...
.


Combinatoriality

Combinatoriality is a side-effect of derived rows where combining different segments or sets such that the pitch class content of the result fulfills certain criteria, usually the combination of hexachords which complete the full chromatic.


Invariance

''Invariant'' formations are also the side effect of derived rows where a segment of a set remains similar or the same under transformation. These may be used as "pivots" between set forms, sometimes used by Anton Webern and
Arnold Schoenberg Arnold Schoenberg or Schönberg (, ; ; 13 September 187413 July 1951) was an Austrian-American composer, music theorist, teacher, writer, and painter. He is widely considered one of the most influential composers of the 20th century. He was as ...
. ''Invariance'' is defined as the "properties of a set that are preserved under
ny given NY most commonly refers to: * New York (state), a state in the Northeastern United States * New York City, the most populous city in the United States, located in the state of New York NY, Ny or ny may also refer to: Places * North Yorkshire, ...
operation, as well as those relationships between a set and the so-operationally transformed set that inhere in the operation", a definition very close to that of mathematical invariance. George Perle describes their use as "pivots" or non-tonal ways of emphasizing certain pitches. Invariant rows are also combinatorial and derived.


Cross partition

A ''cross partition'' is an often monophonic or homophonic technique which, "arranges the pitch classes of an aggregate (or a row) into a rectangular design", in which the vertical columns (harmonies) of the rectangle are derived from the adjacent segments of the row and the horizontal columns (melodies) are not (and thus may contain non-adjacencies). For example, the layout of all possible 'even' cross partitions is as follows:Alegant 2010, 21. : One possible realization out of many for the ''order numbers'' of the 34 cross partition, and one variation of that, are: 0 3 6 9 0 5 6 e 1 4 7 t 2 3 7 t 2 5 8 e 1 4 8 9 Thus if one's tone row was 0 e 7 4 2 9 3 8 t 1 5 6, one's cross partitions from above would be: 0 4 3 1 0 9 3 6 e 2 8 5 7 4 8 5 7 9 t 6 e 2 t 1 Cross partitions are used in Schoenberg's Op. 33a ''Klavierstück'' and also by Berg but Dallapicolla used them more than any other composer.


Other

In practice, the "rules" of twelve-tone technique have been bent and broken many times, not least by Schoenberg himself. For instance, in some pieces two or more tone rows may be heard progressing at once, or there may be parts of a composition which are written freely, without recourse to the twelve-tone technique at all. Offshoots or variations may produce music in which: * the full chromatic is used and constantly circulates, but permutational devices are ignored * permutational devices are used but not on the full chromatic Also, some composers, including Stravinsky, have used cyclic permutation, or rotation, where the row is taken in order but using a different starting note. Stravinsky also preferred the inverse-retrograde, rather than the retrograde-inverse, treating the former as the compositionally predominant, "untransposed" form. Although usually atonal, twelve tone music need not be—several pieces by Berg, for instance, have tonal elements. One of the best known twelve-note compositions is '' Variations for Orchestra'' by
Arnold Schoenberg Arnold Schoenberg or Schönberg (, ; ; 13 September 187413 July 1951) was an Austrian-American composer, music theorist, teacher, writer, and painter. He is widely considered one of the most influential composers of the 20th century. He was as ...
. "Quiet", in
Leonard Bernstein Leonard Bernstein ( ; August 25, 1918 – October 14, 1990) was an American conductor, composer, pianist, music educator, author, and humanitarian. Considered to be one of the most important conductors of his time, he was the first America ...
's ''
Candide ( , ) is a French satire written by Voltaire, a philosopher of the Age of Enlightenment, first published in 1759. The novella has been widely translated, with English versions titled ''Candide: or, All for the Best'' (1759); ''Candide: or, The ...
'', satirizes the method by using it for a song about boredom, and Benjamin Britten used a twelve-tone row—a "tema seriale con fuga"—in his ''Cantata Academica: Carmen Basiliense'' (1959) as an emblem of academicism.Brett 2007.


Schoenberg's mature practice

Ten features of Schoenberg's mature twelve-tone practice are characteristic, interdependent, and interactive:Haimo 1990, 41. #
Hexachord In music, a hexachord (also hexachordon) is a six-note series, as exhibited in a scale (hexatonic or hexad) or tone row. The term was adopted in this sense during the Middle Ages and adapted in the 20th century in Milton Babbitt's serial theor ...
al inversional combinatoriality # Aggregates # Linear set presentation # Partitioning # Isomorphic partitioning # Invariants # Hexachordal
levels Level or levels may refer to: Engineering *Level (instrument), a device used to measure true horizontal or relative heights *Spirit level, an instrument designed to indicate whether a surface is horizontal or vertical *Canal pound or level *Regr ...
#
Harmony In music, harmony is the process by which individual sounds are joined together or composed into whole units or compositions. Often, the term harmony refers to simultaneously occurring frequencies, pitches ( tones, notes), or chords. However ...
, "consistent with and derived from the properties of the referential set" # Metre, established through "pitch-relational characteristics" # Multidimensional set presentations.


See also

* List of dodecaphonic and serial compositions *
All-interval twelve-tone row In music, an all-interval twelve-tone row, series, or chord, is a twelve-tone tone row arranged so that it contains one instance of each interval within the octave, 1 through 11 (an ordering of every interval, 0 through 11, that contains each ...
* All-interval tetrachord *
All-trichord hexachord In music, the all-trichord hexachord is a unique hexachord that contains all twelve trichords, or from which all twelve possible trichords may be derived. The prime form of this set class is and its Forte number is 6-Z17. Its complement is 6-Z43 ...
* Pitch interval * List of tone rows and series


References


Notes


Sources

* Alegant, Brian. 2010. ''The Twelve-Tone Music of Luigi Dallapiccola''. Eastman Studies in Music 76. Rochester, New York: University of Rochester Press. . * Babbitt, Milton. 1960. "Twelve-Tone Invariants as Compositional Determinants". '' The Musical Quarterly'' 46, no. 2, Special Issue: Problems of Modern Music: The Princeton Seminar in Advanced Musical Studies (April): 246–259. . . * Babbitt, Milton. 1961. "Set Structure as a Compositional Determinant". '' Journal of Music Theory'' 5, no. 1 (Spring): 72–94. . * Benson, Dave. 2007
Music: A Mathematical Offering
'. Cambridge and New York: Cambridge University Press. . * Brett, Philip. "Britten, Benjamin." ''
Grove Music Online ''The New Grove Dictionary of Music and Musicians'' is an encyclopedic dictionary of music and musicians. Along with the German-language ''Die Musik in Geschichte und Gegenwart'', it is one of the largest reference works on the history and theo ...
'' ed. L. Macy (Accessed 8 January 2007) * Chase, Gilbert. 1987. ''America's Music: From the Pilgrims to the Present'', revised third edition. Music in American Life. Urbana: University of Illinois Press. (cloth); (pbk). * * Haimo, Ethan. 1990. ''Schoenberg's Serial Odyssey: The Evolution of his Twelve-Tone Method, 1914–1928''. Oxford nglandClarendon Press; New York: Oxford University Press . * Hill, Richard S. 1936. "Schoenberg's Tone-Rows and the Tonal System of the Future". '' The Musical Quarterly'' 22, no. 1 (January): 14–37. . . * Lansky, Paul; George Perle and Dave Headlam. 2001. "Twelve-note Composition". '' The New Grove Dictionary of Music and Musicians'', second edition, edited by
Stanley Sadie Stanley John Sadie (; 30 October 1930 – 21 March 2005) was an influential and prolific British musicologist, music critic, and editor. He was editor of the sixth edition of the '' Grove Dictionary of Music and Musicians'' (1980), which was publ ...
and John Tyrrell. London: Macmillan. * Leeuw, Ton de. 2005. ''Music of the Twentieth Century: A Study of Its Elements and Structure'', translated from the Dutch by Stephen Taylor. Amsterdam: Amsterdam University Press. . Translation of ''Muziek van de twintigste eeuw: een onderzoek naar haar elementen en structuur''. Utrecht: Oosthoek, 1964. Third impression, Utrecht: Bohn, Scheltema & Holkema, 1977. . * Loy, D. Gareth, 2007. ''Musimathics: The Mathematical Foundations of Music'', Vol. 1. Cambridge, Massachusetts and London: MIT Press. . * Neighbour, Oliver. 1954. "The Evolution of Twelve-Note Music". '' Proceedings of the Royal Musical Association'', volume 81, issue 1: 49–61. * Perle, George. 1977. ''Serial Composition and Atonality: An Introduction to the Music of Schoenberg, Berg, and Webern'', fourth edition, revised. Berkeley, Los Angeles, and London: University of California Press. * Perle, George. 1991. ''Serial Composition and Atonality: An Introduction to the Music of Schoenberg, Berg, and Webern'', sixth edition, revised. Berkeley: University of California Press. . * Reti, Rudolph. 1958. ''Tonality, Atonality, Pantonality: A Study of Some Trends in Twentieth Century Music''. Westport, Connecticut: Greenwood Press. . * Rufer, Josef. 1954. ''Composition with Twelve Notes Related Only to One Another'', translated by Humphrey Searle. New York: The Macmillan Company. (Original German ed., 1952) * Schoenberg, Arnold. 1975. ''Style and Idea'', edited by Leonard Stein with translations by Leo Black. Berkeley & Los Angeles: University of California Press. . ** 207–208 "Twelve-Tone Composition (1923)" ** 214–245 "Composition with Twelve Tones (1) (1941)" ** 245–249 "Composition with Twelve Tones (2) (c. 1948)" * Solomon, Larry. 1973. "New Symmetric Transformations". ''
Perspectives of New Music ''Perspectives of New Music'' (PNM) is a peer-reviewed academic journal specializing in music theory and analysis. It was established in 1962 by Arthur Berger and Benjamin Boretz (who were its initial editors-in-chief). ''Perspectives'' was first ...
'' 11, no. 2 (Spring–Summer): 257–264. . * Spies, Claudio. 1965. "Notes on Stravinsky's ''Abraham and Isaac''". ''
Perspectives of New Music ''Perspectives of New Music'' (PNM) is a peer-reviewed academic journal specializing in music theory and analysis. It was established in 1962 by Arthur Berger and Benjamin Boretz (who were its initial editors-in-chief). ''Perspectives'' was first ...
'' 3, no. 2 (Spring–Summer): 104–126. . * Whittall, Arnold. 2008. ''The Cambridge Introduction to Serialism''. Cambridge Introductions to Music. New York: Cambridge University Press. (cloth) (pbk).


Further reading

* Covach, John. 1992. "The Zwölftonspiel of Josef Matthias Hauer". '' Journal of Music Theory'' 36, no. 1 (Spring): 149–84. . * Covach, John. 2000. "Schoenberg's 'Poetics of Music', the Twelve-tone Method, and the Musical Idea". In ''Schoenberg and Words: The Modernist Years'', edited by Russell A. Berman and Charlotte M. Cross, New York: Garland. * Covach, John. 2002, "Twelve-tone Theory". In ''The Cambridge History of Western Music Theory'', edited by Thomas Christensen, 603–627. Cambridge: Cambridge University Press. . * Krenek, Ernst. 1953. "Is the Twelve-Tone Technique on the Decline?" '' The Musical Quarterly'' 39, no 4 (October): 513–527. * Šedivý, Dominik. 2011. ''Serial Composition and Tonality. An Introduction to the Music of Hauer and Steinbauer'', edited by Günther Friesinger, Helmut Neumann and Dominik Šedivý. Vienna: edition mono. * Sloan, Susan L. 1989.
Archival Exhibit: Schoenberg's Dodecaphonic Devices
. ''Journal of the Arnold Schoenberg Institute'' 12, no. 2 (November): 202–205. * Starr, Daniel. 1978. "Sets, Invariance and Partitions". '' Journal of Music Theory'' 22, no. 1 (Spring): 1–42. . * Wuorinen, Charles. 1979. ''Simple Composition''. New York: Longman. . Reprinted 1991, New York: C. F. Peters. .


External links


Twelve tone square
to find all combinations of a 12 tone sequence

by Larry Solomon
Javascript twelve tone matrix calculator and tone row analyzer


by Ricci Adams
Twelve-Tone Technique, A Quick Reference
by Dan Román *
Dodecaphonic Knots and Topology of Words
by
Database on tone rows and tropes
{{Authority control Arnold Schoenberg 12 (number)